Hedging in discrete time under transaction costs and continuous-time limit

Hedging in discrete time under transaction costs and continuous-time limit

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Article ID: iaor20013119
Country: United Kingdom
Volume: 36
Issue: 1
Start Page Number: 163
End Page Number: 178
Publication Date: Mar 1999
Journal: Journal of Applied Probability
Authors: , ,
Keywords: finance & banking
Abstract:

We consider a discrete-time financial market model with L1 risky asset price process subject to proportional transaction costs. In this general setting, using a dual martingale representation we provide sufficient conditions for the super-replication cost to coincide with the replication cost. Next, we study the convergence problem in a stationary binomial model as the time step tends to zero, keeping the proportional transaction costs fixed. We derive lower and upper bounds for the limit of the super-replication cost. In the case of European call options and for a unit initial holding in the risky asset, the upper and lower bounds are equal. This result also holds for the replication cost of European call options. This is evidence (but not a proof) against the common opinion that the replication cost is infinite in a continuous-time model.

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